Enriched ∞-operads as marked algebras
Abstract
We show that an enriched ∞-operad is completely determined by its category of right modules together with a `marking' of the representable modules. More precisely, for any presentably monoidal ∞-category V we construct an equivalence between the category of colored V-enriched ∞-operads and a certain full subcategory of the category of presentably symmetric monoidal V-module ∞-categories equipped with a functor from an ∞-groupoid. This effectively allows us to reduce many aspects of enriched ∞-operad theory to the theory of presentably symmetric monoidal ∞-categories. As an application, we describe a notion of univalence (or Rezk-completeness) for enriched ∞-operads, and directly construct an equivalence between univalent S-enriched ∞-operads in our sense and Lurie's model of ∞-operads. We study envelopes and categories of algebras for enriched ∞-operads and show that, in the S-enriched case, the resulting notions agree in both models.
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